CD Tesis

Hubungan Matriks Stirling Dan Matriks Tribonacci

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Stirling numbers are divided into two types namely Stirling's numbers of the _rst kind s(n; k) and Stirling's numbers of the second kind S(n; k). The tribonacci number is a generalization of a Fibonacci number which has a unique and eisily recognizable shape, since each subsequent tribe is obtained by summing the three previous tribes beginning with the tribes 0, 0 and 1. Stirling's matrix of the _rst kind is expressed Sn(1), 8n 2 N. Then, Stirling's matrix of the second kind is expressed Sn(2), 8n 2 N. The tribonacci matrix is declared by Tn, 8n 2 N. This thesis discusses the relation between Stirling's matrix and tribonacci matrix. Then, from the relationship of the two matrices, namely matrix Un and Dn, the Stirling's matrix of the _rst kind is expressed by Sn(1) = UnTn and Stirling's matrix of the second kind is by Sn(2) = TnDn.
Keywords: Stirling's numbers of the _rst kind, Stirling's numbers of the second kind, tribonacci numbers, Stirling's matrix of the _rst kind, Stirling's matrix of the second kind, tribonacci matrix

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Ketersediaan

Informasi Detail

Judul Seri

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No. Panggil

10 15. 218 (0017)

Penerbit

Pekanbaru : Universitas Riau – Pascasarjana – Tesis Matematika., 2018

Deskripsi Fisik

xii, 53 hlm.; ill.; 29 cm

Bahasa

Indonesia

ISBN/ISSN

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Klasifikasi

10 15. 218 (0017)

Tipe Isi

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Tipe Media

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Tipe Pembawa

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Edisi

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Subjek

PASCASARJANA (MAGISTER) MATEMATIKA

Info Detail Spesifik

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Pernyataan Tanggungjawab

FATAH

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